A circle C1 with centre at the origin meets x-axis at A and B (where A & B lies on negative and positive x−axis respectively). Two points P(a) and Q(b) are on the circle such that b−a is a constant, where a and b are the parametric angles of the points. BP and AQ meets at R. Locus of R is a circle C2.
Let c be the radius of C1 and d be the radius of C2.
List IList II(1)For b−a=π2, the value of d2c2 is (P)0(2)For b−a=π2 and c=√2, circle C2 intersects (Q)1the coordinate axes at four points L,M,N,O. Let the area of the quadrilateral LMNO is 2√2p. Then the value of p is (3)Let m1,m2 be the slopes of the line BQ,AP (R)2 respectively. If m1m2=−1, then ab is (4)Let m1,m2 be the slopes of the line BQ,AP (S)3 respectively. If m1=m2, then 3|b−a|π is (T) 4
Then the CORRECT option is :